# -*- coding: utf-8 -*-
"""
Subraph centrality and communicability betweenness.
"""
#    Copyright (C) 2011 by
#    Aric Hagberg <hagberg@lanl.gov>
#    Dan Schult <dschult@colgate.edu>
#    Pieter Swart <swart@lanl.gov>
#    All rights reserved.
#    BSD license.
import networkx as nx
from networkx.utils import *
__author__ = "\n".join(['Aric Hagberg (hagberg@lanl.gov)',
                        'Franck Kalala (franckkalala@yahoo.fr'])
__all__ = ['subgraph_centrality_exp',
           'subgraph_centrality',
           'communicability_betweenness_centrality',
           'estrada_index'
           ]

@not_implemented_for('directed')
@not_implemented_for('multigraph')
def subgraph_centrality_exp(G):
    r"""Return the subgraph centrality for each node of G.

    Subgraph centrality  of a node `n` is the sum of weighted closed
    walks of all lengths starting and ending at node `n`. The weights
    decrease with path length. Each closed walk is associated with a
    connected subgraph ([1]_).

    Parameters
    ----------
    G: graph

    Returns
    -------
    nodes:dictionary
        Dictionary of nodes with subgraph centrality as the value.

    Raises
    ------
    NetworkXError
        If the graph is not undirected and simple.

    See Also
    --------
    subgraph_centrality:
        Alternative algorithm of the subgraph centrality for each node of G.

    Notes
    -----
    This version of the algorithm exponentiates the adjacency matrix.

    The subgraph centrality of a node `u` in G can be found using
    the matrix exponential of the adjacency matrix of G [1]_,

    .. math::

        SC(u)=(e^A)_{uu} .

    References
    ----------
    .. [1] Ernesto Estrada, Juan A. Rodriguez-Velazquez,
       "Subgraph centrality in complex networks",
       Physical Review E 71, 056103 (2005).
       http://arxiv.org/abs/cond-mat/0504730

    Examples
    --------
    (Example from [1]_)
    >>> G = nx.Graph([(1,2),(1,5),(1,8),(2,3),(2,8),(3,4),(3,6),(4,5),(4,7),(5,6),(6,7),(7,8)])
    >>> sc = nx.subgraph_centrality_exp(G)
    >>> print(['%s %0.2f'%(node,sc[node]) for node in sorted(sc)])
    ['1 3.90', '2 3.90', '3 3.64', '4 3.71', '5 3.64', '6 3.71', '7 3.64', '8 3.90']
    """
    # alternative implementation that calculates the matrix exponential
    import scipy.linalg
    nodelist = list(G) # ordering of nodes in matrix
    A = nx.to_numpy_matrix(G,nodelist)
    # convert to 0-1 matrix
    A[A!=0.0] = 1
    expA = scipy.linalg.expm(A.A)
    # convert diagonal to dictionary keyed by node
    sc = dict(zip(nodelist,map(float,expA.diagonal())))
    return sc

@not_implemented_for('directed')
@not_implemented_for('multigraph')
def subgraph_centrality(G):
    r"""Return subgraph centrality for each node in G.

    Subgraph centrality  of a node `n` is the sum of weighted closed
    walks of all lengths starting and ending at node `n`. The weights
    decrease with path length. Each closed walk is associated with a
    connected subgraph ([1]_).

    Parameters
    ----------
    G: graph

    Returns
    -------
    nodes : dictionary
       Dictionary of nodes with subgraph centrality as the value.

    Raises
    ------
    NetworkXError
       If the graph is not undirected and simple.

    See Also
    --------
    subgraph_centrality_exp:
        Alternative algorithm of the subgraph centrality for each node of G.

    Notes
    -----
    This version of the algorithm computes eigenvalues and eigenvectors
    of the adjacency matrix.

    Subgraph centrality of a node `u` in G can be found using
    a spectral decomposition of the adjacency matrix [1]_,

    .. math::

       SC(u)=\sum_{j=1}^{N}(v_{j}^{u})^2 e^{\lambda_{j}},

    where `v_j` is an eigenvector of the adjacency matrix `A` of G
    corresponding corresponding to the eigenvalue `\lambda_j`.

    Examples
    --------
    (Example from [1]_)
    >>> G = nx.Graph([(1,2),(1,5),(1,8),(2,3),(2,8),(3,4),(3,6),(4,5),(4,7),(5,6),(6,7),(7,8)])
    >>> sc = nx.subgraph_centrality(G)
    >>> print(['%s %0.2f'%(node,sc[node]) for node in sorted(sc)])
    ['1 3.90', '2 3.90', '3 3.64', '4 3.71', '5 3.64', '6 3.71', '7 3.64', '8 3.90']

    References
    ----------
    .. [1] Ernesto Estrada, Juan A. Rodriguez-Velazquez,
       "Subgraph centrality in complex networks",
       Physical Review E 71, 056103 (2005).
       http://arxiv.org/abs/cond-mat/0504730

    """
    import numpy
    import numpy.linalg
    nodelist = list(G) # ordering of nodes in matrix
    A = nx.to_numpy_matrix(G,nodelist)
    # convert to 0-1 matrix
    A[A!=0.0] = 1
    w,v = numpy.linalg.eigh(A.A)
    vsquare = numpy.array(v)**2
    expw = numpy.exp(w)
    xg = numpy.dot(vsquare,expw)
    # convert vector dictionary keyed by node
    sc = dict(zip(nodelist,map(float,xg)))
    return sc

@not_implemented_for('directed')
@not_implemented_for('multigraph')
def communicability_betweenness_centrality(G, normalized=True):
    r"""Return subgraph communicability for all pairs of nodes in G.

    Communicability betweenness measure makes use of the number of walks
    connecting every pair of nodes as the basis of a betweenness centrality
    measure.

    Parameters
    ----------
    G: graph

    Returns
    -------
    nodes : dictionary
        Dictionary of nodes with communicability betweenness as the value.

    Raises
    ------
    NetworkXError
        If the graph is not undirected and simple.

    Notes
    -----
    Let `G=(V,E)` be a simple undirected graph with `n` nodes and `m` edges,
    and `A` denote the adjacency matrix of `G`.

    Let `G(r)=(V,E(r))` be the graph resulting from
    removing all edges connected to node `r` but not the node itself.

    The adjacency matrix for `G(r)` is `A+E(r)`,  where `E(r)` has nonzeros
    only in row and column `r`.

    The subraph betweenness of a node `r`  is [1]_

    .. math::

         \omega_{r} = \frac{1}{C}\sum_{p}\sum_{q}\frac{G_{prq}}{G_{pq}},
         p\neq q, q\neq r,

    where
    `G_{prq}=(e^{A}_{pq} - (e^{A+E(r)})_{pq}`  is the number of walks
    involving node r,
    `G_{pq}=(e^{A})_{pq}` is the number of closed walks starting
    at node `p` and ending at node `q`,
    and `C=(n-1)^{2}-(n-1)` is a normalization factor equal to the
    number of terms in the sum.

    The resulting `\omega_{r}` takes values between zero and one.
    The lower bound cannot be attained for a connected
    graph, and the upper bound is attained in the star graph.

    References
    ----------
    .. [1] Ernesto Estrada, Desmond J. Higham, Naomichi Hatano,
       "Communicability Betweenness in Complex Networks"
       Physica A 388 (2009) 764-774.
       http://arxiv.org/abs/0905.4102

    Examples
    --------
    >>> G = nx.Graph([(0,1),(1,2),(1,5),(5,4),(2,4),(2,3),(4,3),(3,6)])
    >>> cbc = nx.communicability_betweenness_centrality(G)
    """
    import scipy
    import scipy.linalg
    nodelist = list(G) # ordering of nodes in matrix
    n = len(nodelist)
    A = nx.to_numpy_matrix(G,nodelist)
    # convert to 0-1 matrix
    A[A!=0.0] = 1
    expA = scipy.linalg.expm(A.A)
    mapping = dict(zip(nodelist,range(n)))
    cbc = {}
    for v in G:
        # remove row and col of node v
        i = mapping[v]
        row = A[i,:].copy()
        col = A[:,i].copy()
        A[i,:] = 0
        A[:,i] = 0
        B = (expA - scipy.linalg.expm(A.A)) / expA
        # sum with row/col of node v and diag set to zero
        B[i,:] = 0
        B[:,i] = 0
        B -= scipy.diag(scipy.diag(B))
        cbc[v] = float(B.sum())
        # put row and col back
        A[i,:] = row
        A[:,i] = col
    # rescaling
    cbc = _rescale(cbc,normalized=normalized)
    return cbc

def _rescale(cbc,normalized):
    # helper to rescale betweenness centrality
    if normalized is True:
        order=len(cbc)
        if order <=2:
            scale=None
        else:
            scale=1.0/((order-1.0)**2-(order-1.0))
    if scale is not None:
        for v in cbc:
            cbc[v] *= scale
    return cbc

def estrada_index(G):
    r"""Return the Estrada index of a the graph G.

    The Estrada Index is a topological index of folding or 3D "compactness" ([1]_).

    Parameters
    ----------
    G: graph

    Returns
    -------
    estrada index: float

    Raises
    ------
    NetworkXError
        If the graph is not undirected and simple.

    Notes
    -----
    Let `G=(V,E)` be a simple undirected graph with `n` nodes  and let
    `\lambda_{1}\leq\lambda_{2}\leq\cdots\lambda_{n}`
    be a non-increasing ordering of the eigenvalues of its adjacency
    matrix `A`. The Estrada index is ([1]_, [2]_)

    .. math::
        EE(G)=\sum_{j=1}^n e^{\lambda _j}.

    References
    ----------
    .. [1] E. Estrada, "Characterization of 3D molecular structure",
       Chem. Phys. Lett. 319, 713 (2000).
       http://dx.doi.org/10.1016/S0009-2614(00)00158-5
    .. [2] José Antonio de la Peñaa, Ivan Gutman, Juan Rada,
       "Estimating the Estrada index",
       Linear Algebra and its Applications. 427, 1 (2007).
       http://dx.doi.org/10.1016/j.laa.2007.06.020

    Examples
    --------
    >>> G=nx.Graph([(0,1),(1,2),(1,5),(5,4),(2,4),(2,3),(4,3),(3,6)])
    >>> ei=nx.estrada_index(G)
    """
    return sum(subgraph_centrality(G).values())

# fixture for nose tests
def setup_module(module):
    from nose import SkipTest
    try:
        import numpy
    except:
        raise SkipTest("NumPy not available")
    try:
        import scipy
    except:
        raise SkipTest("SciPy not available")
